大象传媒

Key points

Y equals m x plus c. An arrow points to y labelled y coordinate. An arrow points to m labelled gradient 鈥 this is highlighted pink. An arrow points to x labelled x coordinate. An arrow points to c labelled y intercept 鈥 this is highlighted green.
Image caption,
The graph of a oblique straight line is described using the equation, 饾挌 = 饾拵饾挋 + 饾拕
  • Graphs of two or more straight lines can be used to solve simultaneous linear equations.

  • The graph of a straight line can be described using an .

    • lines are written as \(y = c\)
    • lines are written as \(x = c\)
    • are written as \(y = mx + c\)
  • \(m\) is a number which is a measure of the steepness of the line. This is the .

  • \(c\) is the number where the line crosses the \(y\)-axis. This is the \(y\).

  • The of the points on an oblique line are calculated by given values of \(x\) into the equation \(y = mx + c\)

Y equals m x plus c. An arrow points to y labelled y coordinate. An arrow points to m labelled gradient 鈥 this is highlighted pink. An arrow points to x labelled x coordinate. An arrow points to c labelled y intercept 鈥 this is highlighted green.
Image caption,
The graph of a oblique straight line is described using the equation, 饾挌 = 饾拵饾挋 + 饾拕
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Recognise and draw the lines 饾挌 = 饾挋 and 饾挌 = -饾挋

All the points on the line \(y = x\) have coordinates with equal values for \(x\) and \(y\)

  • To draw the line \(y = x\):
    1. Plot points with coordinates where \(x\) and \(y\) are equal. Three points are sufficient, but more can be plotted.
    2. Draw a line through the plotted points.

All the points on the line \(y = -x\) have coordinates with values for \(x\) and \(y\) that are equal in but with opposite signs.

If \(x\) is positive, \(y\) is negative. If \(x\) is negative, \(y\) is positive.

  • To draw the line \(y = -x\):
    1. Plot points with coordinates where \(x\) and \(y\) have equal magnitude but opposite signs.
    2. Draw a line through the plotted points.

Examples

Image gallerySkip image gallerySlide 1 of 6, Label to the left of a graph y equals x. Graph showing the x axis and y axis increasing in units of five and ten and decreasing in units of minus five and minus ten. Intersecting diagonally through the origin point labelled, open brackets, nought, nought close brackets and below is the word origin. The positive plot line rises to the right through two points. The first point is open bracket four, four close bracket. The second point is open bracket six, six close bracket. At the top end of the plot line is y equals x. At the origin point, the plot line representing negative descends diagonally to the left with two points labelled open bracket minus four, minus four, close bracket and open bracket, minus eight, minus eight, close bracket., The straight line 饾挌 = 饾挋 passes through the origin. All the points on the line 饾挌 = 饾挋 have coordinates with equal values for 饾挋 and 饾挌

Question

One graph shows \(y = x\) and one shows \(y = -x\). Which graph shows \(y = x\)?

Two graphs, one labelled A and a second labelled B. Graph A showing the x axis and y axis increasing in units of five from minus ten to ten, intersecting at zero comma zero. A diagonal line passes through the origin, sloping down from left to right 鈥 this is highlighted orange. Graph B showing the x axis and y axis increasing in units of five from minus ten to ten, intersecting at zero comma zero. A diagonal line passes through the origin, sloping up from left to right 鈥 this is highlighted orange.

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Draw the graph 饾挌 = 饾拵饾挋 + 饾拕 by creating a table of values

\(m\) is a number which measures the steepness of the line. This is known as the gradient.

\(c\) is the number where the line crosses the \(y\)-axis. This is the \(y\)-intercept.

  • To draw a graph of \(y = mx + c\) for given values of \(x\):
    1. Use the given values for \(x\) to draw a table of values for \(x\) and \(y\)
    2. each value of \(x\) into the equation to find the valueof \(y\). Each pair of values give a coordinate.
    3. Use the coordinates to decide on that will take all the values of \(x\) and \(y\)
    4. Plot the coordinates and draw a line through the points. Label the line with the equation.

Example

Image gallerySkip image gallerySlide 1 of 9, Y equals two x minus five. Minus one is less than or equal to x, which is less than or equal to three., Draw the graph of 饾挌 = 2饾挋 鈥 5 for values of 饾挋 from -1 to 3. This is written as the inequality -1 鈮 饾挋 鈮 3

Questions

Question 1: Complete the table of values for \(y = 3x + 8\) for values of \(x\) from -2 to 2

Y equals three x plus eight. Minus two is less than or equal to x, which is less than or equal to two. Underneath is a six by two table with values of x on the first row from left to right, minus two, minus one, zero, one, and two. The second row is empty for unknown values of y.

A table of values can also be used to find the coordinates of a line with a negative gradient.

Question 2: Complete the table of values for \(y = 3 鈥 2x\) for values of \(x\) from -1 to 3

Y equals three minus two x Minus one is less than or equal to x, which is less than or equal to three. Underneath is a six by two table with values of x on the first row from left to right, minus one, zero, one, two and three. The second row is empty for unknown values of y.

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Reading 饾挋 and 饾挌 coordinates from a graph

A position on a graph is defined by coordinates (\(x\), \(y\)). When one coordinate is given, the second can be read from the graph.

  • To find a \(y\)-coordinate from a given \(x\)-coordinate:

    1. On the \(x\)-axis, locate the given amount.
    2. Draw a vertical line, using a ruler, from the given amount up to the line.
    3. Draw a horizontal line, using a ruler, from the line across to the \(y\)-axis.
    4. Read the value on the \(y\)-axis.
  • To find an \(x\)-coordinate from a given \(y\)-coordinate:

    1. On the \(y\)-axis, locate the given amount.
    2. Draw a horizontal line, using a ruler, from the given amount across to the line.
    3. Draw a vertical line, using a ruler, from the line down to the \(x\)-axis.
    4. Read the value on the \(x\)-axis.

Examples

Image gallerySkip image gallerySlide 1 of 6, Example one. A graph showing the x axis increasing from minus five to five and the y axis increasing in units of tens from minus ten to thirty, they intersect at zero comma zero. An oblique line slopes up the graph from left to right labelled y equals five x plus four. To the right of the graph, the equations x equals four and y equals question mark., Use the graph to find the value of 饾挌 when 饾挋 = 4

Question

Use the graph to find the value of \(x\) when \(y = 3\)

A graph showing the x axis increasing in units of one from minus five to six and the y axis increasing in units of one from minus one to five. They intersect at zero comma zero. An oblique line slopes down the graph from left to right labelled y equals two minus x divided by two. It crosses the x axis at four and the y axis at two. To the right of the graph, the equations y equals two and x equals question mark.

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Practise reading and plotting linear equation graphs

Quiz

Practise reading and plotting linear equation graphs with this quiz. You may need a pen and paper to help you.

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Real-life maths

A person at a currency exchange window counting euro notes
Image caption,
A linear graph could be used when exchanging euros into pounds, two different types of currency.

Linear graphs are commonly used when converting between different units of measurement.

For example, swapping between temperatures in degrees Celsius (掳C) and degrees Fahrenheit (掳F), exchanging between different currencies, such as pounds and euros, or changing inches into centimetres.

A person at a currency exchange window counting euro notes
Image caption,
A linear graph could be used when exchanging euros into pounds, two different types of currency.
A pharmacist measuring a powder on a scale
Image caption,
Giving the correct strength of a drug to a patient is vital.

Linear graphs are useful to pharmacists and scientists in the pharmaceutical industry when working out the correct strength of drugs.

The amount of a drug for a given volume of medicine is critical, both for the medicine to be effective and for the safety of the patient.

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Game - Divided Islands

Play the Divided Islands game! game

Using your maths skills, help to build bridges and bring light back to the islands in this free game from 大象传媒 Bitesize.

Play the Divided Islands game!
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More on Graphs

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